Fourier series

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In mathematics, the Fourier series, named after Joseph Fourier (1768—1830), refers to an infinite series representation of a periodic function ƒ of a real variable ξ, of period P:

${\displaystyle f(\xi +P)=f(\xi )\ .}$

In the case of a complex-valued function ƒ(ξ), Fourier's theorem states that an infinite series, known as a Fourier series, is equivalent (in some sense) to such a function:

${\displaystyle f(\xi )=\sum _{n=-\infty }^{\infty }c_{n}e^{2\pi in\xi /P}}$

where the coefficients {c_n} are defined by

${\displaystyle c_{n}={\frac {1}{P}}\int _{0}^{P}f(\xi )\exp \left({\frac {-2\pi in\xi }{P}}\right)\,d\xi \ .}$

In what sense it may be said that this series converges to ƒ(ξ) is a complicated question.^[1][2] However, physicists being less delicate than mathematicians in these matters, simply write

${\displaystyle f(\xi )=\sum _{n=-\infty }^{\infty }c_{n}e^{2\pi in\xi /P}\ ,}$

and usually do not worry too much about the conditions to be imposed on the arbitrary function ƒ(ξ) of period P in order that this expansion converge to the function.

Propagating waveforms

Fourier's theorem states that any (real) periodic function can be expressed as a sum of sinusoidal functions with periods related to P:^[3]

${\displaystyle f(\xi )=a_{0}+\sum _{1}^{\infty }a_{n}\cos \left({\frac {2\pi }{P/n}}\xi +\varphi _{n}\right)\ ,}$

a series of cosines with various phases {φ_n}.

If the function is a fixed waveform propagating in time, we may take ξ as:

${\displaystyle \xi =x-vt\ ,}$

where x is a position in space, v is the speed of propagation and t is the time. The period in space at a fixed instant in time is called the wavelength λ=P, and the period in time at a fixed position in space is called the period T=λ/v. Thus, a function periodic in time with period T can be expressed as a Fourier series:^[4]

${\displaystyle f(t)=a_{0}+\sum _{1}^{\infty }a_{n}\cos \left(n\omega _{0}t+\varphi _{n}\right)\ ,}$

where ω₀ = 2π/T is called the fundamental frequency and its multiples 2ω₀, 3ω₀,... are called harmonic frequencies and the terms cosines are called harmonics. A function f(x) of spatial period λ, can be synthesized as a sum of harmonic functions whose wavelengths are integral sub-multiples of λ (i.e. λ, λ/2, λ/3, etc.):^[3]

${\displaystyle f(x)=a_{0}+\sum _{1}^{\infty }a_{n}\cos \left({\frac {2\pi }{\lambda /n}}x+\varphi _{n}\right)\ .}$

References